Citation
Abstract
Suppose f is a real-valued continuous function on the unit square. The problem of finding a level curve of f which joins opposite sides of the square is investigated. It is shown that while f need not have such a level curve, it at least always has a level connected set with the desired property. This problem is connected with the problem of minimizing the bandwidth of a certain matrix. f=) 1
Details
- Volume
- III
- Published
- June 15, 1971
- Pages
- 108–110
- File Size
- 212.4 KB